Rocket Physics Application of Conservation of Momentum Lab
Rocket Physics Application of Conservation of Momentum Lab. Rat Scientific © 2018 1
In this lesson we will learn how to estimate the velocity of a rocket based on a specific exit velocity of the rocket motor exhaust and the total mass of the propellant being used. This concept relies on the idea of “Conservation of Momentum”. VP x M P VR x M R 2
Conservation of Momentum The rocket exhaust has mass and it leaves the rocket at a very high velocity. As such, the exhaust gas has Momentum (= Mass x Velocity)… This momentum is transferred to the rocket. Newton’s Second Law (and the law of conservation of momentum) says the momentum of the rocket will be equal and opposite the momentum of the exhaust gas. Conservation of Momentum is depicted mathematically as: Velocity. Propellant x Mass. Propellant VP x M P = Velocity. Rocket x Mass. Rocket VR x M R If we know the mass of the fuel and the exhaust velocity, we can estimate the final velocity of the rocket after the motor burns out. 3
Example: What is the delta-V of a 10, 000 lb (dry) orbital rocket that burns 5, 000 lb of fuel with an exhaust exit velocity of 3, 000 ft/sec? Velocity. Propellant x Mass. Propellant = Velocity. Rocket x Mass. Rocket Velocity. Rocket = Velocity. Propellant x Mass. Propellant --------------------------Mass. Rocket Velocity. Rocket = 3, 000 Ft/Sec x 5, 000 lb -----------------------10, 000 lb Yes, you are right, Pound is not a unit of Mass, but do you really want to work in “slugs”… Besides, the units cancel anyway! Velocity. Rocket = 1, 500 Ft/Sec (1, 023 MPH) Again, this is an approximate value since the mass of the rocket is changing over time as the propellant is ejected… Should we use the dry weight, the wet weight (rocket + fuel), or something in between? 4
Validation of theory using data from a NASA Terrier-Orion Sounding Rocket (analysis of 1 st stage burn) Total Lift-Off Weight: Terrier Propellant Weight: Exhaust Exit Velocity: Using Conservation of Momentum Velocity. Propellant x Mass. Propellant 4, 005 lbs 1, 511 lbs 7, 900 ft/sec = Velocity. Rocket x Mass. Rocket Velocity. Rocket = Velocity. Propellant x Mass. Propellant --------------------------Mass. Rocket Velocity. Rocket = 7, 9000 Ft/Sec x 1, 511 lb -----------------------4, 005 lb Velocity. Rocket = 2, 980 Ft/Sec ( 2, 032 MPH ) 5
Actual NASA performance simulations of the Terrier-Orion sounding rocket indicate the burnout velocity at the end of Terrier (first stage) burn is 2, 190 MPH. The 2, 032 MPH (estimated) value is pretty close to the 2, 190 MPH velocity generated by flight simulations, so it looks like theory gives a pretty good estimate The difference is due to many factors, most of which tend to cancel out (i. e. aerodynamic and gravity losses not accounted for in the conservation of momentum approach, and the fact that the momentum approach does not account for the time varying system mass). . .
Questions? 7
- Slides: 7